The periodic correlation bounds of binary sequence pairs are derived.
给出了二元序列偶在周期相关条件下的理论界。
Firstly, the periodic correlation bounds of binary sequence pair is educed, which provide the theory foundation for further research of binary sequence pair sets with good correlation property.
首先推导出二元序列偶的周期相关理论界,这为进一步研究具有良好相关特性的二元序列偶集提供了理论基础。
This paper presents a new kind of perfect correlation signal, that is, odd-periodic perfect punctured binary sequence pair.
定义了一种新的最佳相关信号,即奇周期最佳屏蔽二进序列偶。
Based on the odd-perfect almost binary sequences, the new odd-periodic correlation complementary sequence set is obtained.
基于一类完备周期奇相关函数的几乎二元序列,得到了一类新型奇相关互补序列集。
The transformation features and Fourier spectrum of odd-periodic perfect almost binary sequence pair are studied. Some combined admissibility conditions are also given out.
同时研究了奇周期最佳几乎二进序列偶的变换性质和频谱特性,给出了一些组合允许条件。
The transformation features and Fourier spectrum of odd-periodic perfect almost binary sequence pair are studied. Some combined admissibility conditions are also given out.
同时研究了奇周期最佳几乎二进序列偶的变换性质和频谱特性,给出了一些组合允许条件。
应用推荐